In this paper, we study two systems of generalized Sylvester operator equations. We derive necessary and sufficient conditions for the existence of a solution and provide the general form of a solution. We extend some recent results to more general settings.

A. Ben-Israel, T. N. E. Greville, Generalized Inverse: Theory and Applications, 2nd Edition, Springer, New York, 2003.

A. Dajic, Common solutions of linear equations in ring, with applications, Electron. J. Linear Algebra, 30 (2015), 66-79.

S.G. Lee, Q.P. Vu, Simultaneous solutions of matrix equations and simultaneous equivalence of matrices, Linear Algebra Appl., 437 (2012), 2325-2339.

Y. H. Liu, Ranks of solutions of the linear matrix equation AX + Y B = C. Comput. Math. Appl., 52 (2006), 861-872.

Q.W. Wang, Z.H. He, Solvability conditions and general solution for the mixed Sylvester equations, Automatica, 49 (2013), 2713-2719.

Z.H. He, Q.W. Wang, A pair of mixed generalized Sylvester matrix equations, Journal of Shanghai University (Natural Science), 20 (2014), 138-156.

Z.-H. He, Q.-W. Wang, Y. Zhang, A system of quaternary coupled Sylvester-type real quaternion matrix equations, Automatica, 87 (2018), 25-31.